∞-type theories

Abstract

We introduce ∞-type theories as an ∞-categorical generalization of the categorical definition of type theories introduced by the second named author. We establish analogous results to the previous work including the construction of initial models of ∞-type theories, the construction of internal languages of models of ∞-type theories, and the theory-model correspondence for ∞-type theories. Some structured (∞,1)-categories are naturally regarded as models of some ∞-type theories. Thus, since every (1-categorical) type theory is in particular an ∞-type theory, ∞-type theories provide a unified framework for connections between type theories and (∞,1)-categorical structures. As an application we prove Kapulkin and Lumsdaine's conjecture that the dependent type theory with intensional identity types gives internal languages for (∞,1)-categories with finite limits.

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